David Helm
Published 2020-09-17Version 1
We construct, for every prime p, a function field K of characteristic p and an ordinary abelian variety A over K, with no isotrivial factors, that admits an etale self-isogeny of p-power degree. As a consequence, we deduce that there exist ordinary abelian varieties over function fields whose groups of points over the maximal purely inseparable extension is not finitely generated, answering in the negative a question of Thomas Scanlon.
Birational characterization of abelian varieties and ordinary abelian varieties in characteristic p>0
On the group of purely inseparable points of an abelian variety defined over a function field of positive characteristic
Arithmetic degrees for dynamical systems over function fields of characteristic zero
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